Unit Uniquely Clean Rings
Abstract
We define the class of unit uniquely clean rings ( UnitUC for short), that is a common generalization of uniquely clean rings and strongly nil clean rings. Abelian UnitUC rings are uniquely clean and UnitUC rings with nil Jacobson radical are strongly nil clean. These rings also generalize the UUC and CUC rings, defined by Calugareanu-Zhou in Mediterranean J. Math. (2023), which are rings whose clean elements are uniquely clean. These rings are also represent a natural generalization of the Boolian rings in that a ring is UnitUC if, and only if, it is exchange and Boolean modulo the Jacobson radical. The behavior of UnitUC rings under group ring and matrix ring extensions is investigated. Several examples are provided to explain and delimit the results.
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